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11 April, 00:40

There is a unique positive real number x such that the three numbers

log82x, log4x and log2x, in that order, form a geometric progression with a positive common ratio.

The number x can be written as m/n, where m and n are relatively prime positive integers.

Find m+n.

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Answers (1)
  1. 11 April, 04:22
    0
    Answer: 17

    Step-by-step explanation:

    If the log82x, log4x and log2x, in that order, form a geometric progression with a positive common ratio.

    Let a = log82x, b = log4x and c = log2x

    If a = log8 2x; 8^a = 2x ... (1)

    If b = log4 x; 4^b = x ... (2)

    If c = log2 x; 2^c = x ... (3)

    Since a, b c are in GP, then b/a = c/b

    Cross multiplying:

    b² = ac ... (4)

    From eqn 1, x = 8^a/2

    x = 2^3a/2

    x = 2^ (3a-1)

    From eqn 2; x = 4^b

    x = 2^2b

    From eqn 3: x = 2^c

    Equating all the values of x, we have;

    2^ (3a-1) = 2^2b = 2^c

    3a-1 = 2b = c

    3a-1 = c and 2b = c

    a = c+1/3 and b = c/2

    Substituting the value of a = c+1/3 and b = c/2 into equation 4 we have;

    (c/2) ² = c+1/3*c

    c²/4 = c (c+1) / 3

    c/4 = c+1/3

    Cross multiplying;

    3c = 4 (c+1)

    3c = 4c+4

    3c-4c = 4

    -c = 4

    c = - 4

    Substituting c = - 4 into equation 3 to get the value of x we have;

    2^c = x

    2^-4 = x

    x = 1/2^4

    x = 1/16

    Since the number x can be written as m/n, then x = 1/16 = m/n

    This shows that m = 1, n = 16

    m+n = 1+16

    m+n = 17

    The required answer is 17.
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